Moniz_not_Ernie said:
Given an initial mass of some isotope subjected to a constant neutron flux, how fast will the mass drop off? Would not the survival curve look exactly like the curve for radioactive decay? Both cases describe a starting mass subjected to a constant transformative force at a rate that depends on the size of the population. The target mass shrinks in both cases, whether the cause is internal or external. Can’t the decay formula can be used for both? Does this concept have a name?
One is referring to transmutation, and like one calculates the rate of change by decay, one can calculate the rate of transmutation.
The rate of decay is given by λn(t), where λ is the decay constant and n(t) is the number of atoms (of the radionuclide) at a given time, and the change in n(t) is given by d n(t) / dt = -λ n(t), which indicates n(t) is decreasing with time due to decay.
Similarly, the rate of transmutation is proportional to σφ, where σ is the total microscopic cross-section for neutron absorption reactions and φ is the neutron flux. It's actually more complicated since σ and φ are functions of energy. The product σφ is analogous to λ, and d N(t) = -σφ N(t). For a monoenergetic source, the evaluation of σφ is pretty straightforward, but for a neutron energy spectrum, one has to integrate over the range of neutron energies.
I assume here that the target is a stable isotope. If the isotope is unstable, i.e., it is decaying, then one must consider decay and transmutation, and so, the rate of loss is proportional to (λ+σφ).
One would use the term 'depletion rate', for the loss of an isotope, or production rate for the product of transmutation. When we discuss the consumption of U-235 in a nuclear reactor, we often refer to 'depletion' rather than consumption, but it's the same thing.
