Nonlinear multi-wave coupling and resonance in elastic structures (стр. 4 из 5)

So, if at least the one eigenvalue of

approaches zero, then the corresponding coefficient of the transform (15) tends to infinity. Otherwise, if , then represents the lowest term of a formal expansion in .

Analogously, in the second-order approximation in

:

the eigenvalues of

can be written in the same manner, i. e. , where , etc.

By continuing the similar formal iterations one can define the transform (15). Thus, the sets (12) and (13), even in the absence of eigenvalues equal to zeroes, are associated with formally equivalent dynamical systems, since the function

can be a divergent function. If is an analytical function, then these systems are analytically equivalent. Otherwise, if the eigenvalue in the -order approximation, then eqs. (12) cannot be simply reduced to eqs. (13), since the system (12) experiences a resonance.

For example, the most important 3-order resonances include

triple-wave resonant processes, when

and ;

generation of the second harmonic, as

and .

The most important 4-order resonant cases are the following:

four-wave resonant processes, when

; (interaction of two wave couples); or when and (break-up of the high-frequency mode into tree waves);

degenerated triple-wave resonant processes at

and ;

generation of the third harmonic, as

and .

These resonances are mainly characterized by the amplitude modulation, the depth of which increases as the phase detuning approaches to some constant (e. g. to zero, if consider 3-order resonances). The waves satisfying the phase matching conditions form the so-called resonant ensembles.

Finally, in the second-order approximation, the so-called “non-resonant" interactions always take place. The phase matching conditions read the following degenerated expressions

cross-interactions of a wave pair at

and ;

self-action of a single wave as

and .

Non-resonant coupling is characterized as a rule by a phase modulation.

The principal proposition of this section is following. If any nonlinear system (12) does not have any resonance, beginning from the order

up to the order , then the nonlinearity produces just small corrections to the linear field solutions. These corrections are of the same order that an amount of the nonlinearity up to times .

To obtain a formal transform (15) in the resonant case, one should revise a structure of the set (13) by modifying its right-hand side:

(16)

;

,

where the nonlinear terms

. Here are the uniform -th order polynomials. These should consist of the resonant terms only. In this case the eqs. (16) are associated with the so-called normal forms.

Remarks

In practice the series

are usually truncated up to first - or second-order terms in .

The theory of normal forms can be simply generalized in the case of the so-called essentially nonlinear systems, since the small parameter

can be omitted in the expressions (12) - (16) without changes in the main result. The operator can depend also upon the spatial variables .

Formally, the eigenvalues of operator

can be arbitrary complex numbers. This means that the resonances can be defined and classified even in appropriate nonlinear systems that should not be oscillatory one (e. g. in the case of evolution equations).

Resonance in multi-frequency systems

The resonance plays a principal role in the dynamical behavior of most physical systems. Intuitively, the resonance is associated with a particular case of a forced excitation of a linear oscillatory system. The excitation is accompanied with a more or less fast amplitude growth, as the natural frequency of the oscillatory system coincides with (or sufficiently close to) that of external harmonic force. In turn, in the case of the so-called parametric resonance one should refer to some kind of comparativeness between the natural frequency and the frequency of the parametric excitation. So that, the resonances can be simply classified, according to the above outlined scheme, by their order, beginning from the number first

, if include in consideration both linear and nonlinear, oscillatory and non-oscillatory dynamical systems.

For a broad class of mechanical systems with stationary boundary conditions, a mathematical definition of the resonance follows from consideration of the average functions

(17)

, as ,

where

are the complex constants related to the linearized solution of the evolution equations (13); denotes the whole spatial volume occupied by the system. If the function has a jump at some given eigen values of and , then the system should be classified as resonant one[6]. It is obvious that we confirm the main result of the theory of normal forms. The resonance takes place provided the phase matching conditions

and .

are satisfied. Here

is a number of resonantly interacting quasi-harmonic waves; are some integer numbers ; and are small detuning parameters. Example 1. Consider linear transverse oscillations of a thin beam subject to small forced and parametric excitations according to the following governing equation