Belonging to 1 and 1, respectively, to obtain the solutions
Download 393.36 Kb.
|
270-284
- Bu sahifa navigatsiya:
- Inhomogeneous systems
- Variation of constants
- Theorem 3.11 Let
|
— belonging to 1 and 1, respectively, to obtain the solutions →v1(t) = et→e1 and →v2(t) = e—t→e2. Since →v (t) = et and v→ (t) = e—t , X (t) = . et —e—t is a matrix solution. et e—t et —e—t 1 —1 Then X (0) = 1 1 ; since det X (0) = —2 if follows from proposition 3.4.3 that X (t) is a fundamental matrix solution. Example 3.4.2 Find the general solution of the system 3.21, and also the solution 5 with initial value →v(0) = 3 . Solution. In example 3.4.1, we found a fundamental matrix solution, The general solution is →v = = et e—t X = et —e—t X t →c e e—t c1 t = e —e—t c2 c1et + c2e—t c1et — c2e—t 1 —1 = c1et 1 + c2e—t 1 . X To find the solution of the IVP, we must find a vector →c such that (0)→c is equal to the specified value of →v(0). Thus we must solve the equation 1 1 1 —1 c1 = 3 . 5 c2 or, equivalently, (c1, c2) must satisfy the system c1 + c2 = 3 c1 — c2 = 5 —1 which yields (c1, c2) = (4, —1). The solution of the IVP is therefore 1 →v(t) = 4et 1 — e—t 1 Inhomogeneous systemsThe method for solving an inhomogeneous system of linear ODEs, →v′ = A(t)→v + →f (t), (3.22) × where A(t) is an n n matrix, is basically the same as the method we used in section 1.3 to solve a single first order linear ODE. We start with the general solution of the associated homogeneous system, →v′ = A(t)→v, which we can express in terms of a fundamental matrix solution, →vh(t) = X (t)→c and add a particular solution →vp(t) of the inhomogeneous equation. X Theorem 3.10 Suppose that all entries of the coefficient matrix A(t) and source vector →f (t) in (3.22) are continuous on an interval (a, b). Let →vp(t) be a particular solution of the system (3.22), and let (t) be a fundamental matrix solution of the associated homogeneous system. Then the general solution of the system (3.22) on (a, b) is →v(t) = →vp(t) + X (t)→c. PROOF. Let →v(t) be an arbitrary solution of the inhomogeneous sys- tem (3.22), and put →y(t) = →v(t) — →vp(t). Then →y′ = →v′ — →v′p = [A(t)→v + →f (t)] — [A(t)→vp + →f (t)] = A(t)→v — A(t)→vp = A→y. It follows that →y(t) is a solution of the associated homogeneous system. Therefore there is a unique constant vector →c such that →y(t) = X (t)→c; X and it follows that →v(t) = →vp(t) + (t)→c. X Conversely, suppose that →v(t) = →vp(t) + (t)→c, where →c is a constant vector. Then dt p d (→v(t)) = →v′ (t) + X ′(t)→c = A(t)→vp(t) + →f (t) + A(t)X (t)→c = A(t)(→vp(t) + X (t)→c) + →f (t) = A(t)→v(t) + →f (t); in other words, →v(t) is a solution of (3.22). Theorem 3.10 can best be deployed in conjunction with a method for finding particular solutions of systems. Variation of constantsThe method of variation of constants is used to find a particular solution of an inhomogeneous system. Recall from section 1.3, where the method was introduced for the scalar case, that the general solution of the associated homogeneous equation was a required input. For systems, it is convenient to start with a fundamental matrix solution of the associated homogeneous system. The key to adapting the method for systems of linear ODEs is inversion of a matrix solution. This replaces division by yh(t) in the scalar case (as in equation (1.11)). P Let P be a square matrix. A square matrix Q is called the inverse matrix of if P Q = Q P = I, where I is the identity matrix. We will use the customary notation P—1 for the inverse matrix of P. The following theorem is from linear algebra. Although it is true for square matrices of any size, our proof only works for 2 × 2 matrices. Theorem 3.11 Letb d P = a c be a nonsingular matrix. Then P has an inverse matrix. — PROOF By proposition 3.2.2, det(P) = ad bc is equal to 0 if and only if P is singular. Thus, if P is nonsingular, det(P) /= 0. Define a matrix Q as Q = 1 d —b . det(P) —c a You can verify that P Q = I and Q P = I by matrix multiplication. X We will now see how to find a particular solution of an inhomogeneous system of ODEs. Let (t) be a fundamental matrix solution of a homo- geneous system →v′ = A(t)→v. To find a particular solution of an inhomoge- neous system →v′ = A(t)→v + →f (t) (3.23) set →vp(t) = X (t)w→ (t), where w→ (t) is a vector function that will be determined. By the product rule for differentiation, →v′p = X ′(t)w→ (t) + X (t)w→ ′(t) = A(t)X (t)w→ (t) + X (t)w→ ′(t) = A(t)→vp(t) + X (t)w→ ′(t). It follows that →vp(t) is a particular solution of the system (3.23) if and only if X (t)w→ ′(t) = →f (t). (3.24) X X Since (t) is nonsingular, it has an inverse —1(t). Multiplying (3.24) by this, we have Now that w→ (t) has been determined we can find →vp(t) by multiplying by X (t). This can be summarized as follows: It is not necessary to memorize this formula; you just need to remember to substitute →v = X (t)w→ in (3.23). Example 3.4.3 Find a particular solution of x1′ x2′ = x2 e—t — = x1 + e—t Solution. In example 3.4.1, it was shown that X (t) = e e et —e—t t —t is a = = fundamental matrix solution of the associated homogeneous system (3.21). Set →vp(t) = X (t)w→ (t). Thus x1 et e—t w1 x2 et —e—t w2 etw1 + e—tw2 etw1 — e—tw2 = + — Differentiating, and using the product rule we have x1′ x2′ etw1′ + e—tw2′ etw1′ — e—tw2′ etw1 e—tw2 etw1 + e—tw2 = — e—t and the right side of our system is — x2 e—t x1 + e—t etw1 e—tw2 etw1 + e—tw2 + —e—t The solution of this equation is w1′ = 0, w2′ = —1, or —1 w→ ′(t) = 0 . —t (t) = = — . Thus w→ (t) = 0 , and we have the particular solution →vp et e—t 0 et —e—t —t te—t te—t X The general solution is →vp(t) + →vh(t), where →vh(t) = (t)→c denotes the general solution of the associated homogeneous equation. Download 393.36 Kb. Do'stlaringiz bilan baham: 
|