The following function is the solution to the differential equation

˙

v

=

λv

+

+

k

S

(

t

)

k

with the initial condition

v

(

t

0

) = 0

:

v

(

t

) =

e

λt

t

Z

t

0

k

S

(

τ

)

k

e

−

λτ

dτ,

That is why, with all

t

∈

[

t

0

, t

∗

]

inequality (12) is true:

k

V

(

t

)

k

6

e

λt

Z

t

t

0

k

S

(

τ

)

k

e

−

λτ

dτ

and, consequently,

k

V

(

t

∗

)

k

6

e

λt

∗

t

∗

Z

t

0

k

S

(

t

)

k

e

−

λt

dt.

(15)

From the non-negativity of the subintegral function in the right part of

inequality (15) we have

t

∗

Z

t

0

k

S

(

t

)

k

e

−

λt

dt

6

Z

t

∗

0

k

S

(

t

)

k

e

−

λt

dt,

and with this, we get inequality (13) from (15).

Now we can prove the main result.

Theorem 3.

Let us assume the following:

1)

q

(

z

1

, . . . , z

m

, η

) =

r

P

i

=1

A

i

z

i

+

Kη

+

p

(

z

1

, . . . , z

m

)

where

A

1

, . . . , A

r

,

K

are

ρ

×

ρ

-matrixes

;

2)

matrix

M

=

A

1

+

KA

2

+

K

2

A

3

+

. . .

+

K

r

−

1

A

r

is nondegenerated

;

3)

there is such

ε >

0

, that for all

i

= 1

, r

and

(

z

1

, . . . , z

m

)

∈

R

n

−

ρ

the inequalities

k

∂p/∂z

i

k

6

ε

are fulfilled

;

4)

λ

is the largest proper number of the matrix

(

P

+

P

T

)

/

2

, where

P

=

M

−

1

KM

;

γ

=

 

(

k

M

−

1

k

εL

+

k

P

k

)

t

∗

,

if

λ

= 0;

(

k

M

−

1

k

εL

+

k

P

k

)

e

λt

∗

−

1

λ

,

if

λ

6

= 0

.

(16)

If

γ <

1

, then terminal problem (3), (4) for system (2) has got a solution.

J

Let us assume

c

ρ

+1

=

. . .

=

c

m

= 0

, then denote the vector with

unknown parameters by

c

= (

c

1

, . . . , c

ρ

)

T

. Then Cauchy problem (5) will

take the form of

˙

η

=

q

(

b

1

(

t

) +

c

1

d

1

(

t

)

, . . . , b

ρ

(

t

) +

c

ρ

d

ρ

(

t

)

, b

ρ

+1

(

t

)

, . . . , b

m

(

t

)

, η

);

η

(0) =

η

0

.

(17)

22

ISSN 1812-3368. Herald of the BMSTU. Series “Natural Sciences”. 2014. No. 5