Electrical Signaling by Neurons

Ions Diffuse Across the Membrane Through Ion Channels—Protein Molecules With Pores

Some membrane-spanning proteins consist of several subunits surrounding a central aqueous pore (see Fig. 7.2B ). Ions whose size and charge “fit” the pore can diffuse through it, allowing these proteins to serve as ion channels. Hence unlike the lipid bilayer, ion channels have an appreciable permeability (or conductance ^b

b Conductance and permeability technically have slightly different meanings but are commonly used interchangeably. A membrane permeable to a given ion easily conducts currents carried by that kind of ion.

) to some ions. In electrical terms, they function as resistors, ^c

c Resistance is simply the inverse of conductance. A channel with high conductance has little resistance to current flow, and vice versa.

allowing a predictable amount of current flow in response to a voltage across them (see Resistors, Capacitors, and Neuronal Membranes). Although hundreds of different ion channels have been described, they have some characteristics in common:

• Multiple states. Most or all ion channels can exist in two or more different, stable conformations. The different conformations fall into two general categories: open, in which the pore is available for ions to traverse, and closed, in which the pore is occluded enough to prevent ion flow. Open channels have high conductance, and closed channels have low conductance, so ion channels are variable resistors; this is the key to their role in membrane potential changes. Remarkably, the transitions between these different conductance states can be observed directly using patch-clamp techniques ( Box 7.1 ; see Fig. 7.17 ). Most channels in resting neuronal membranes are closed and respond to particular stimuli by opening, although the opposite is also found.

  Box 7.1

  Methods of Measuring Voltages and Currents Across Neuronal Membranes

  Knowledge of the mechanism of electrical signaling by neurons grew during the 20th century and continues to expand with the development of more sophisticated techniques. Very early work depended on indirect methods, such as measuring currents and voltages in extracellular spaces outside neurons. In the 1930s Hodgkin, Huxley, Katz, Cole, and others began to take advantage of the huge axons that certain invertebrates have developed as a means of increasing conduction velocity (see Fig. 7.22 ). Methods were devised to thread wires longitudinally through these axons and record currents and voltages directly across the axon membrane.

  At about the same time, other workers found that controlled heating and stretching of capillary tubing until it snaps can produce micropipettes with tip diameters smaller than 1 µm. Filled with a salt solution, these micropipettes can be used as electrodes for recording voltages and currents across neuronal membranes; the tip diameter is small enough to puncture many kinds of relatively large neurons without damaging them too much ( Fig. 7.3A ).

  Micropipette electrodes were a mainstay of neurophysiologists for decades, but they always had shortcomings. They damaged small cells and processes, and even when the method was successful, it was possible to record events only across relatively large expanses of membranes. A technique that opened up new horizons appeared in the late 1970s, when Neher and Sakmann developed patch clamping (see Fig. 7.3B ). Patch clamping makes it possible to record events across the membranes of small cells and processes; even more remarkably, it allows the recording of the activity of individual ion channels in patches of membrane (see Fig. 7.17 ).

  

• Gating. The opening and closing of an individual ion channel is a probabilistic event, and the channel can flip between these states nearly instantaneously. Most channels are tuned to certain factors that affect their probability of being open or closed. ^d

  d Discussions in this and other chapters may seem to imply that populations of channels as a whole open or close (slowly or suddenly) in response to some stimulus. The individual channels in such populations, however, exist in an equilibrium state, flipping back and forth between different states; the only thing that changes is the probability of being in one or another state. A population of channels, each with a slowly increasing probability of being open, would seem macroscopically like a population of channels all opening slowly at the same time.

  Some channels open in response to changes in membrane potential and are referred to as voltage-gated channels ( Fig. 7.4A and B ). The best understood of these is the voltage-gated sodium channel that underlies action potentials (see Fig. 7.10 ), but there are also voltage-gated potassium, calcium, and chloride channels. Other channels open or close in response to the binding of signaling molecules (see Fig. 7.4C and D ). The bound molecule is called a ligand (from the Latin ligare, “to bind”), so these are ligand-gated channels. The best known of these are postsynaptic receptors that bind specific neurotransmitters and change their permeability in response (see Chapter 8 ), but other channels bind intracellular ligands released in response to various stimuli. Some channels are thermally gated, allowing the neurons that contain them to function as miniature thermometers or as thermal injury detectors (see Chapters 9 and 23 ). Finally, some channels are mechanically gated. A prominent example is the receptor cells of the inner ear (see Fig. 14.7 ), but others are known (e.g., see Fig. 23.7 ).

  

• Selectivity. The central pores of ion channels are not wide enough to let any and all ions traverse them. Rather, the size of the pore and the nature of the amino acid residues lining it are such that some ions can diffuse through more easily than others. Some channels are minimally selective and may simply distinguish between small anions and small cations. Others are highly selective and may be, for example, hundreds of times more permeable to sodium ions than to potassium ions.

The many different types of ion channels generally are not distributed uniformly in neuronal membranes. Rather, neurons somehow manage to place them preferentially in sites that make functional sense. For example, although the channels that determine the resting membrane potential are widely distributed, voltage-gated sodium channels are grouped so that only certain regions of a neuron can generate action potentials. Similarly, appropriate ligand-gated channels are located in postsynaptic membranes across from presynaptic terminals and not in other locations. This selective regional distribution of channels and other membrane proteins forms much of the basis for the functional specialization of different parts of each neuron.

Small differences in amino acid sequences are sufficient to change the selectivity of a channel, and many channel types are closely related to each other. All the voltage-gated cation channels are the products of one closely related family of genes; some ligand-gated postsynaptic receptors are related to the voltage-gated channels, and others evolved independently. Although the chemical differences between channel types are often subtle, they are nevertheless sufficient to allow pharmacological manipulation of particular channels. This is commonly exploited in the treatment of disease states. Conversely, some diseases are the result of abnormal functioning of particular channel types (see Box 7.2 ).

The Number and Selectivity of Ion Channels Determine the Membrane Potential

The importance of ion channels in the development of the resting membrane potential is indicated in Fig. 7.5 . A lipid bilayer separating intracellular and extracellular fluids with the ionic concentrations shown in Table 7.1 would not develop a membrane potential. Even though all the ion species involved (including Ca ²⁺ , which is not indicated in Fig. 7.5 , to keep things a little simpler) are unequally distributed, the impermeability of the membrane would prevent them from moving down their concentration gradients (see Fig. 7.5A ). The number of positive charges and negative charges on each side of the membrane would be identical.

Consider what would happen if ion channels selectively permeable only to K ⁺ were added to such a membrane (see Fig. 7.5B ). K ⁺ ions would be equally free to diffuse into or out of the cell through these channels. However, simply because there are so many more K ⁺ ions inside the cell than outside, more K ⁺ ions would move out than in (i.e., K ⁺ ions would flow out of the cell down the K ⁺ concentration gradient). This would leave behind a number of intracellular negative charges. Because opposite charges attract each other, the excess intracellular negative charges would attract K ⁺ ions back into the cell. At a time determined by the number of channels available for K ⁺ ion movement, the concentration gradient driving K ⁺ out of the cell would be exactly counterbalanced by the intracellular negativity; the K ⁺ current moving out of the cell would be equal and opposite to the K ⁺ current moving into the cell (see Fig. 7.5C ). The system at this point is in equilibrium: no energy is required to maintain it in this state. The membrane potential at which this equilibrium is reached is the potassium equilibrium potential (V _K ); its value can be calculated using a logarithmic relationship called the Nernst equation, knowing only the intracellular and extracellular K ⁺ concentrations, the temperature, and some physical constants (see Calculating the Membrane Potential). Each ion species that is unequally distributed across the membrane has an equilibrium potential that can be calculated in the same way (see Table 7.1 ), indicating the membrane potential that would develop if the membrane were permeable solely to this type of ion (and the potential at which there would be no net movement of that ion in either direction).

The initial net outward movement of K ⁺ ions required to establish this membrane potential is actually extremely small, just enough to charge up the membrane capacitance—and no significant change in intracellular or extracellular K ⁺ concentration results. For example, the net outward movement of only about 175 million K ⁺ ions is enough to establish the predicted membrane potential of −94 mV across the membrane of a spherical cell 100 µm in diameter. Although this sounds like a lot of ions, a cell this size with an intracellular K ⁺ concentration of 130 mM contains about 4 × 10 ¹³ K ⁺ ions, so the net loss of K ⁺ ions required to establish this membrane potential is less than 0.001% of the starting number. This is a common theme in electrical signaling by neurons: substantial electrical signals can be generated by moving relatively minuscule numbers of ions, so intracellular and extracellular ionic concentrations change little over brief periods of time. (As seen later in this chapter, however, active pumping mechanisms are required to maintain ionic concentration gradients over long periods.) Knowing the equilibrium potential of the different ions aids in understanding how the movement of ions across the membrane for normal function, disease states, and under conditions of treatment relate to the function of neurons. For example, if a treatment is given allowing potassium to freely move into the neuron while all other ions are held constant (not allowed to move), the resting membrane becomes more negative (close to −94 mV, the equilibrium potential for K ⁺ ) and the cell is less likely to become excited. Therefore drugs that may enhance the opening of potassium channels are more likely to slow neuronal function.

The Resting Membrane Potential of Typical Neurons Is Heavily Influenced, but Not Completely Determined, by the Potassium Concentration Gradient

The scenario just developed is actually close to the situation in typical neurons, whose membrane at rest is dominated by a steady potassium conductance. Hence the resting membrane potential of typical neurons is near the potassium equilibrium potential. Increases in extracellular potassium concentration cause the membrane potential to become less negative, by almost the amount predicted by the Nernst equation ( Fig. 7.6 ). However, the membrane is never quite as negative as the potassium equilibrium potential, and the deviation becomes greater the lower the extracellular potassium concentration becomes. Clinically relevant is when a person becomes hypokalemic (low potassium), excitable cells like neurons can become even more excitable in that the resting membrane potential becomes less negative, or, in other words, the cell becomes more excitable.

The basis for this deviation from the membrane potential predicted by the Nernst equation is the additional presence of a relatively small resting permeability to Na ⁺ ions, as indicated in Fig. 7.5D and E . If one imagines this permeability being added to the K ⁺ -permeable membrane of Fig. 7.5C , an inward flow of Na ⁺ ions results, driven not only by the interior negativity of the cell but also by the Na ⁺ concentration gradient (see Fig. 7.5D ). The inward Na ⁺ current would be small because the Na ⁺ conductance is small, but it would nevertheless move positive charges into the cell, making its interior less negative. This in turn would cause the membrane potential to move slightly away from V _K , creating a small voltage gradient that drives K ⁺ ions out of the cell. Assuming that concentrations remain constant, a steady state is reached, in which the small inward Na ⁺ current (small because the Na ⁺ conductance is small) is exactly counterbalanced by a small outward K ⁺ current (small because the conductance is relatively large but the voltage gradient is small). The exact membrane potential at this steady state is somewhere between V _K and V _Na , dictated by the relative magnitudes of the K ⁺ and Na ⁺ permeabilities (see Calculating the Membrane Potential). Typical neurons have resting Na ⁺ permeabilities that are 1% to 10% as great as the resting K ⁺ permeability, so the resting membrane potential is a weighted average of V _K and V _Na , or around −65 mV (closer to V _K than to V _Na because of the greater K ⁺ permeability).

Concentration Gradients Are Maintained by Membrane Proteins That Pump Ions

There is a major difference between the equilibrium condition that exists when the membrane is permeable to only one ion (see Fig. 7.5C ) and the steady state that is achieved when the membrane is permeable to more than one ion (see Fig. 7.5E ). In the equilibrium condition the equal and opposite current flows involve the same ion (e.g., K ⁺ ), so no concentration changes ensue and no energy is required to maintain the condition. In the steady-state condition, the equal and opposite current flows involve different ions and eventually result in concentration changes. In the typical neuronal situation, the small but constant inward Na ⁺ and outward K ⁺ currents, if uncompensated, would slowly dissipate the Na ⁺ and K ⁺ concentration gradients across the membrane. The equilibrium potential for ions with no concentration gradient is 0 mV, so the membrane potential would slowly fade away. Another class of membrane proteins called ion pumps allows this dilemma to be circumvented by neurons and, indeed, by all cells. The best studied of these is a membrane-spanning Na ⁺ /K ⁺ ATPase, so called because it uses the energy released by hydrolysis of adenosine triphosphate (ATP) to move Na ⁺ ions out of the cell and K ⁺ into the cell ( Fig. 7.5F ). These Na ⁺ /K ⁺ pumps move three Na ⁺ ions out of the cell and two K ⁺ ions into the cell per hydrolysis of an ATP. The inhibition of these pumps results in the loss of the cells’ excitability characteristics and their ability to function. In addition, Ca ²⁺ ions and Cl ⁺ ions can also move into cells in response to certain kinds of stimuli, and specific membrane pumps are available to redistribute them as well. All of them pump at concentration-sensitive rates, so they speed up when there are more ions to be extruded or recaptured.