**infinite multiplication factor**is the ratio of the

**neutrons produced by fission**in one neutron generation to the number of

**neutrons lost through absorption**in the preceding neutron generation. The infinite multiplication factor (k

_{∞}) may be expressed mathematically in terms of these factors by following equation, usually known as the

**four factor formula**:

**k _{∞} = η.ε.p.f**

In this section, **the infinite multiplication factor**, which describes all the possible events in the life of a neutron and effectively describes the state of an infinite multiplying system, will be defined.

The required condition for a **stable, self-sustained fission chain reaction** in a multiplying system (in a nuclear reactor) is that **exactly every fission initiate another fission**. The minimum condition is for each nucleus undergoing fission to produce, on the average, at least one neutron that causes fission of another nucleus. Also the number of fissions occurring per unit time (the reaction rate) within the system must be constant.

This condition can be expressed conveniently in terms of **the multiplication factor**. The infinite multiplication factor is the ratio of the **neutrons produced by fission** in one neutron generation to the number of **neutrons lost through absorption** in the preceding neutron generation. This can be expressed mathematically as shown below.

It is obvious** the infinite multiplication factor** in a multiplying system is a measure of the change in the fission neutron population from one neutron generation to the subsequent generation.

**k**. If the multiplication factor for a multiplying system is_{∞}< 1**less than 1.0**, then the**number of neutrons is decreasing**in time (with the mean generation time) and the chain reaction will never be self-sustaining. This condition is known as**the subcritical state**.

**k**. If the multiplication factor for a multiplying system is_{∞}= 1**equal to 1.0**, then there is**no change in neutron population**in time and the chain reaction will be**self-sustaining**. This condition is known as**the critical state**.

**k**. If the multiplication factor for a multiplying system is_{∞}> 1**greater than 1.0**, then the multiplying system produces**more neutrons**than are needed to be self-sustaining. The number of neutrons is exponentially increasing in time (with the mean generation time). This condition is known as**the supercritical state**.

## Four Factor Formula

But **the infinite multiplication factor** can be defined also in terms of the most important **neutron-physical processes** that occur in the nuclear reactor. For simplicity, we will first consider a multiplying system that is **infinitely large**, and therefore has **no neutron leakage**. In the infinite system. There are **four factors** that are completely independent of the size and shape of the reactor that describe the **inherent multiplication ability** of the fuel and moderator materials without regard to leakage:

See also: Fast Fission Factor

See also: Resonance Escape Probability

See also: Thermal Utilization Factor

See also: Reproduction Factor

The infinite multiplication factor (k_{∞}) may be expressed mathematically in terms of these factors by following equation, usually known as the **four factor formula**:

**k _{∞} = η.ε.p.f**

In reactor physics, **k _{∞}** or its finite form

**k**is the most significant parameter with regard to reactor control. At any specific power level or condition of the reactor,

_{eff}**k**is kept as nearto the value of

_{eff}**1.0**as possible. At this point in operation, the

**neutron balance**is kept to exactly one neutron completing the life cycle for each original neutron absorbed in the fuel.

## From infinite to effective multiplication factor

The infinite multiplication factor is derived based on the assumption of **no neutrons leak out of the reactor** (i.e. a reactor is infinitely large). But in reality, each nuclear reactor is finite and neutrons can leak out of the reactor core. The multiplication factor that takes **neutron leakage** into account is the **effective multiplication factor** – **k _{eff}**, which is defined as the ratio of the

**neutrons produced by fission**in one neutron generation to the number of

**neutrons lost through absorption and leakage**in the preceding neutron generation.The effective multiplication factor (

**k**) may be expressed mathematically in terms of the infinite multiplication factor (k

_{eff}_{∞}) and two additional factors which account for

**neutron leakage**during neutron thermalisation (

**fast non-leakage probability**) and neutron leakage during neutron diffusion (

**thermal non-leakage probability**) by following equation, usually known as the

**six factor formula**:

**k _{eff} = k_{∞} . P_{f} . P_{t}**

## Operational factors that affect the multiplication in PWRs.

Detailed knowledge of all possible operational factors that may affect the multiplication factor of the system are of importance in the **reactor control**. It was stated the **k _{eff} **is during reactor operation kept as near to the value of

**1.0 as possible**.

**The criticality**of the reactor is influenced by many factors. For illustration, in an extreme case also the presence of human (due to the water, carbon, which are good neutron moderators) near fresh uranium fuel assembly influences the multiplication properties of the assembly.If any operational factor changes one of the contributing factors to

**k**(

_{eff}**k**), the ratio of 1.0 is not maintained and this change in

_{eff}= η.ε.p.f.P_{f}.P_{t}**k**makes the reactor either

_{eff}**subcritical**or

**supercritical**. Some examples of these operational changes, that may take place in PWRs, are below and are described in a separate article in detail.

**change in the control rods position****change in the boron concentration****change in the moderator temperature****change in the fuel temperature****change in the pressure****change in the flow rate****presence of boiling of the coolant****presence of burnable absorbers****fuel burnup**

See also: Operational changes that affect the multiplication in PWRs.