Sans Superellipse Omkuy 2 is a bold, normal width, monoline, upright, normal x-height font visually similar to 'Chamelton' by Alex Khoroshok, 'Nuber Next' by The Northern Block, 'Kommon Grotesk' by TypeK, 'Gineso Titling' by insigne, and 'Pulse JP' and 'Pulse JP Arabic' by jpFonts (names referenced only for comparison).
Keywords: headlines, branding, posters, signage, ui labels, modern, friendly, confident, clean, robust, approachability, high impact, clarity, contemporary feel, rounded corners, compact, solid, geometric, high contrast (white/ink.
A heavy, geometric sans with softened, rounded-rectangle construction and consistently blunt terminals. Strokes are uniform in thickness, with broad counters and smooth curves that read as superelliptical rather than purely circular. The proportions feel compact and sturdy, with fairly wide bowls and minimal stroke modulation, producing an even, blocky texture in text. Lowercase forms are simple and functional (single-storey a and g), and the overall silhouette stays stable and highly legible at large sizes.
Works well for headlines, logos, packaging, and promotional layouts where a bold, approachable voice is needed. The clean, rounded shapes also suit UI labels, navigation, and signage, especially where clarity at a glance and a contemporary feel are priorities.
The rounded geometry gives the type a warm, approachable tone while the dense weight and crisp shapes keep it assertive and contemporary. It feels straightforward and tech-adjacent without becoming sterile, balancing friendliness with a strong, dependable presence.
The design appears intended to deliver maximum impact with a soft-edged geometric personality—combining a strong, compact footprint with rounded, superelliptical forms for a modern but welcoming look.
In the sample text, the heavy weight creates strong emphasis and a tight color on the page; spacing appears tuned for display or short bursts of text rather than lengthy reading. The numerals are similarly robust and geometric, matching the rounded-square motif for a cohesive set.