A story of kpfonts - TUG

170 TUGboat, Volume 31 (2010), No. 3
1 Sample page of mathematical typesetting
First some large operators both in text: Q
f (x,y,z)dx dy dz and ∏ γ∈Γ˜C
∂(˜X γ ); and
also on display:
Q
∮
f (w,x,y,z)dw dx dy dz ≤
f
(max
′
∂Q
⎡ ⎧
⊎ ⎭
⎢⎣
⎛⎜ f ∗ Q(t) ⎫ ⎞⎤
⎩
⎝
√
1 − t 2
⎟⎠ ⎥⎦
Q⋐ ¯Q
{ })
‖w‖
|w 2 + x 2 | ; ‖z‖ ‖w ⊕ z‖
|y 2 + z 2 ;
| ‖x ⊕ y‖
t=ϑ
t=α
(1)
For x in the open interval ]−1,1[ the infinite sum in Equation (2) is convergent;
however, this does not hold throughout the closed interval [−1,1].
(1 − x) −k = 1 +
∞∑
{ } k
(−1) j x j for k ∈ N; k 0. (2)
j
j=1
Figure 3: Options nofligatures and uprightgreeks
1 Sample page of mathematical typesetting
First some large operators both in text: Q
f (x,y,z)dx dy dz and ∏ γ∈Γ˜C
(˜X γ ); and
also on display:
Q
∮
f (w,x,y,z)dw dx dy dz ≤
f
(max
′
Q
⎡ ⎧
⊎ ⎭
⎢⎣
⎛⎜ f ∗ Q(t) ⎫ ⎞⎤
⎩
⎝
√
1 − t 2
⎟⎠ ⎥⎦
Q⋐ ¯Q
{ })
‖w‖
|w 2 + x 2 | ; ‖z‖ ‖w ⊕ z‖
|y 2 + z 2 ;
| ‖x ⊕ y‖
t=ϑ
t=α
(1)
For x in the open interval ]−1,1[ the infinite sum in Equation (2) is convergent;
however, this does not hold throughout the closed interval [−1,1].
(1 − x) −k = 1 +
∞∑
{ } k
(−1) j x j for k ∈ N; k 0. (2)
j
j=1
Figure 4: Options lightmath and partialup
Christophe Caignaert