Approximate analytical determination of vibrodiagnostic parameters of a cracked elastic body under subharmonic resonance. Part 2. Strong resonance

Abstract: 534.08;620.175.5 Using the approach proposed in Part 1, an approximate calculation of vibration parameters is made for an elastic body with a closing crack, in the region of a strong 1/2-order subharmonic resonance with the lower-harmonic amplitude of free vibration spectrum larger than the main amplitude of forced vibrations.

“…In this case, the upper signs "+" pertain to equations ( ¢ 1 ), ( ¢¢ 1 ), ( ¢ 2 ), and ( ¢¢ 2 ), and the lower signs "-" to ( ¢ 3 ), ( ¢¢ 3 ), ( ¢ 4 ), and ( ¢¢ 4 ). The results of the earlier calculations [3,8] demonstrate that under the resonances at hand the value of the main vibrodiagnostic parameter (the relative amplitude of the resonant harmonic) is independent of the level of the exciting force relative amplitude q 0 but is governed by the value of the parameters of nonlinearity a and damping capacity h of the vibrating system. During the calculations, the constitutive equations for the vibrodiagnostic parameter were found by considering algebraic sums of input equations like (9) …”

“…Some approximate analytical solutions were derived earlier for the determination of vibrodiagnostic parameters of the above-mentioned type of damage in an elastic body under forced vibration in the region of a strong and weak 1/2-order resonances [2,3] as well as a weak 2nd-order superharmonic resonance [1].…”

“…The examples of how to determine the parameters k and a for rods of rectangular cross section under tension and bending as well as for rectangular plates in bending under the conditions of deformation by natural modes of vibrations and in the presence of various types of mode I cracks were discussed in the publications [3,4] and [5,6], respectively; 2) in a superharmonic resonance n w = 0 2, in addition to the fundamental -first -harmonic À t 1 1 sin( ) n g -corresponding to the exciting force frequency n, there arises vibration with a spectrum of harmonic components of the fundamental resonance (n w = 0 ), which is determined using an asymptotic method of the nonlinear mechanics [1,7]. Here, w 0 is the natural frequency of an elastic body when the crack in it is closing [2],…”

“…As mentioned in [1,2], one of the least studied lines in the field of assessment of possible changes of the vibration state of a structural member during its long-term operation and in the development of vibrodiagnostic methods for detecting damages such as fatigue cracks is to establish relations between a closing crack parameters and the vibration parameters in nonlinear resonances.Some approximate analytical solutions were derived earlier for the determination of vibrodiagnostic parameters of the above-mentioned type of damage in an elastic body under forced vibration in the region of a strong and weak 1/2-order resonances [2, 3] as well as a weak 2nd-order superharmonic resonance [1].To further elaborate on the publication [1], we will discuss here an approximate analytical solution for the case of a strong superharmonic resonance.Approximate Solution Procedure. The procedure is based on the fundamentals as stated in [1, 2]: 1) in the case of a fairly small mode I crack we can disregard some difference in the modes of vibration of an elastic body between its deformation half-cycles, where the crack is open and closed, respectively, and for the given natural mode of vibration we can represent the body by a model of a single-degree-of-freedom system with an asymmetric bilinear characteristic of the restoring force.…”

“…As mentioned in [1,2], one of the least studied lines in the field of assessment of possible changes of the vibration state of a structural member during its long-term operation and in the development of vibrodiagnostic methods for detecting damages such as fatigue cracks is to establish relations between a closing crack parameters and the vibration parameters in nonlinear resonances.…”

Approximate analytical determination of vibrodiagnostic parameters of the presence of a crack in an elastic body under superharmonic resonance

“…In this case, the upper signs "+" pertain to equations ( ¢ 1 ), ( ¢¢ 1 ), ( ¢ 2 ), and ( ¢¢ 2 ), and the lower signs "-" to ( ¢ 3 ), ( ¢¢ 3 ), ( ¢ 4 ), and ( ¢¢ 4 ). The results of the earlier calculations [3,8] demonstrate that under the resonances at hand the value of the main vibrodiagnostic parameter (the relative amplitude of the resonant harmonic) is independent of the level of the exciting force relative amplitude q 0 but is governed by the value of the parameters of nonlinearity a and damping capacity h of the vibrating system. During the calculations, the constitutive equations for the vibrodiagnostic parameter were found by considering algebraic sums of input equations like (9) …”

“…Some approximate analytical solutions were derived earlier for the determination of vibrodiagnostic parameters of the above-mentioned type of damage in an elastic body under forced vibration in the region of a strong and weak 1/2-order resonances [2,3] as well as a weak 2nd-order superharmonic resonance [1].…”

“…The examples of how to determine the parameters k and a for rods of rectangular cross section under tension and bending as well as for rectangular plates in bending under the conditions of deformation by natural modes of vibrations and in the presence of various types of mode I cracks were discussed in the publications [3,4] and [5,6], respectively; 2) in a superharmonic resonance n w = 0 2, in addition to the fundamental -first -harmonic À t 1 1 sin( ) n g -corresponding to the exciting force frequency n, there arises vibration with a spectrum of harmonic components of the fundamental resonance (n w = 0 ), which is determined using an asymptotic method of the nonlinear mechanics [1,7]. Here, w 0 is the natural frequency of an elastic body when the crack in it is closing [2],…”

“…As mentioned in [1,2], one of the least studied lines in the field of assessment of possible changes of the vibration state of a structural member during its long-term operation and in the development of vibrodiagnostic methods for detecting damages such as fatigue cracks is to establish relations between a closing crack parameters and the vibration parameters in nonlinear resonances.Some approximate analytical solutions were derived earlier for the determination of vibrodiagnostic parameters of the above-mentioned type of damage in an elastic body under forced vibration in the region of a strong and weak 1/2-order resonances [2, 3] as well as a weak 2nd-order superharmonic resonance [1].To further elaborate on the publication [1], we will discuss here an approximate analytical solution for the case of a strong superharmonic resonance.Approximate Solution Procedure. The procedure is based on the fundamentals as stated in [1, 2]: 1) in the case of a fairly small mode I crack we can disregard some difference in the modes of vibration of an elastic body between its deformation half-cycles, where the crack is open and closed, respectively, and for the given natural mode of vibration we can represent the body by a model of a single-degree-of-freedom system with an asymmetric bilinear characteristic of the restoring force.…”

“…As mentioned in [1,2], one of the least studied lines in the field of assessment of possible changes of the vibration state of a structural member during its long-term operation and in the development of vibrodiagnostic methods for detecting damages such as fatigue cracks is to establish relations between a closing crack parameters and the vibration parameters in nonlinear resonances.…”

Approximate analytical determination of vibrodiagnostic parameters of the presence of a crack in an elastic body under superharmonic resonance

Approximate analytical method for determining the vibration-diagnostic parameter indicating the presence of a crack in a distributed-parameter elastic system at super- and subharmonic resonances

Approximate determination of vibrodiagnostic parameter of nonlinearity for an elastic body due to the presence of a breathing crack at a subharmonic resonance